En
  • دکتری (1390)

    سازه های آبی

    دانشگاه تربیت مدرس، تهران، ایران

  • کارشناسی‌ارشد (1385)

    سازه های آبی

    دانشگاه تربیت مدرس، تهران، ایران

  • کارشناسی (1382)

    آبیاری

    دانشگاه شهید چمران، اهواز، ایران

  • مدلسازی ریاضی تشخیص منابع آلاینده (حل معکوس معادلات انتقال آلاینده)
  • استخراج حلهای تحلیلی ریاضی حاکم بر حرکت آلاینده ها و جریان سیالات
  • حل عددی معادلات مربوط به حرکت جریان آب در رودخانه ها و دریاچه ها
  • دینامیک سیالات محاسباتی
  • توسعه نرم افزارهای مرتبط

    داده ای یافت نشد

    ارتباط

    رزومه

    Shoreline spatial and temporal response to natural and human effects in Boujagh National Park, Iran

    Morteza Karimi, Jamal Mohammad Vali Samani, Mehdi Mazaheri
    Journal PapersInternational Journal of Sediment Research , 2021 February 27, {Pages }

    Abstract

    Shoreline variation and river deltas are among the most dynamic systems in marine environments. The related different variations in spatial and temporal scales play significant roles in land planning and different management applications. Modeling the dynamics of seashore of Boujagh National Park (BNP) which is located on the southern coast of the Caspian Sea in the Sefidrud Delta (SD), considering natural and anthropogenic factors, was the main objective of the current study. To achieve this goal, a combination of remote sensing data, historical data, and numerical simulations was utilized. The BNP covers an area of 3270 ha and includes two international wetlands, Boujagh and Kiashahr. In earlier periods, this area faced severe morphologic

    An Analytical solution to two-dimensional unsteady pollutant transport equation with arbitrary initial condition and source term in the open channels

    Neda Mashhadgarme, Mehdi Mazaheri, Jamal Mohammad Vali Samani
    Journal PapersJournal of the Earth and Space Physics , 2021 January 25, {Pages }

    Abstract

    Pollutant distribution is one of the most important challenges in the world. The governing equation of this phenomenon is the Advection-Dispersion-Reaction (ADRE) equation. It has wide applications in water and atmosphere, heat transfer and engineering sciences. This equation is a parabolic partial differential equation that is based on the first Fick’s law and continuity equation. The application of pollution transport mathematical models in rivers is very vital. Analytical solutions are useful in understanding the contaminant distribution, transport parameter estimation, and numerical model verification. One of the powerful methods in solving nonhomogeneous partial differential equations analytically in one or multi-dimensional domains

    Introducing a new method for calculating the spatial and temporal distribution of pollutants in rivers

    S Amiri, M Mazaheri, N Bavandpouri Gilan
    Journal PapersInternational Journal of Environmental Science and Technology , 2021 January 4, {Pages 18-Jan }

    Abstract

    Using constant coefficients is an inefficient way to explain the details of the problem of pollutant transport. This is due to factors such as nonuniform geometry, discharge changes, flow velocity and dispersion coefficient variations. Previous studies indicate that the ratio of studies on pollutant transport in rivers is lower than those on the porous media. However, the relative complexity of the solution of the pollutant transport equation in rivers (especially in the case of variable coefficients) in comparison with porous media highlights the importance of focusing on the solutions for rivers environment. In this study, the one-dimensional equation of pollutant transport in the river with location-dependent variables (velocity, dispers

    The effect of neglecting spatial variations of the parameters in pollutant transport modeling in rivers

    Elham Karami Cheme, Mehdi Mazaheri
    Journal PapersEnvironmental Fluid Mechanics , 2021 March 25, {Pages 17-Jan }

    Abstract

    For many environmental projects and plans, it is necessary to model pollutant transport in rivers. Pollutant transport modeling is a complex phenomenon with multiple factors affecting it. The basic governing equation describing pollutant transport is advection–dispersion equation. There are two main parameters in this equation, namely, dispersion coefficient and flow velocity. In non-uniform flow regimes, these parameters are both spatially variable, therefore, solution of the advection–dispersion equation usually accomplished using numerical methods. Spatial variability of these parameters makes it hard to determine them, particularly for dispersion coefficient in which determining it for non-uniform flows using the corresponding formu

    Evaluation of the performance of river water quality monitoring stations of Iran

    N Khodamoradi Vatan, M Mazaheri, J Mohammadvali Samani
    Journal Papers , , {Pages }

    Abstract

    Analytical solution of the pollution transport equation with variable coefficients in river using the Laplace Transform

    MJ Fardadi Shilsar, M Mazaheri, J Mohammad Vali Samani
    Journal Papers , , {Pages }

    Abstract

    Analysis of TRMM precipitation data uncertainty in groundwater level modeling of Rafsanjan plain

    S Seyf, A Sharafati
    Journal Papers , , {Pages }

    Abstract

    The Comparison of Inverse approaches Simulation-Optimization and Surrogate Transport Model for Pollution Source Characteristics Identification in Aquifer-River Integrated Systems

    A Jamshidi, J Mohammad Vali Samani, H Mohammad Vali Samani, ...
    Journal Papers , , {Pages }

    Abstract

    Inverse Modeling of Contaminant Transport for Pollution Source Identification in Surface and Groundwaters: A Review

    MB Moghaddam, M Mazaheri, JMV Samani
    Journal Papers , , {Pages }

    Abstract

    An Innovative Framework for Real Time Monitoring of Pollutant Point Sources in River Networks

    M Mazaheri, JMV Samani, F Boano
    Journal Papers , , {Pages }

    Abstract

    شناسایی منابع آلاینده چندگانه در رودخانه در دامنه یک‌بعدی تحت شرایط واقعی‎

    امیری, مظاهری, محمد ولی سامانی, جمال‎
    Journal Papers , , {Pages }

    Abstract

    ارائه یک چارچوب جهت بازیابی شدت منابع آلاینده در رودخانه در دامنه یکبعدی و تحت شرایط واقعی

    امیری, مظاهری, محمد ولی سامانی, جمال
    Journal Papersنشریه مهندسی عمران و محیط زیست دانشگاه تبریز , 2020 October 3, {Pages }

    Abstract

    بحث شناسایی و بازیابی تابع شدت منابع آلاینده ناشناخته، یکی از مهمترین مسائل و چالشهای زیستمحیطی در رودخانهها است. ازاینرو لزوم بهرهگیری از روشهای مطمئن و دقیق جهت بازیابی اطلاعات مربوط به شدت زمانی و زمان رهاسازی آلودگی از منابع آلاینده در رودخانه اجتنابناپذیر است. در هرکدام از روشهای حل معکوس معادله جابهجایی-پراکندگی در رودخانه، محدودیتها و نقاط ضعفی وجود دارد، بنابراین روشی مورد نیاز است که علاوه بر دقت و ک

    Assessment of Time Integration Methods in the Numerical Solution of Two-Dimensional Shallow Water Equations

    Morad Asadi, Mahdi Mazaheri, J Mohamad Vali Samani
    Journal PapersIrrigation Sciences and Engineering , Volume 43 , Issue 2, 2020 August 22, {Pages 215-230 }

    Abstract

    ConclusionsIn this study, in order to compare two common time integration methods, including RK-3 and Strang method, two models were implemented and used to simulate 1D and 2D flow problems. In the 1D dam break problem, which is an actual experimental test case, both models provide satisfactory results. However, at the beginning of the simulation when flow is completely fluctuating, the RK-3 method has a higher accuracy. But over time, by decreasing fluctuating, both models have identical results which are close to experimental data. In the 2D oscillation problem with an analytical solution, water boundary remains circular in different frequencies, which refers to the capability of both models to simulate 2D problems and indicates an approp

    Solving Inverse Problems of Unknown Contaminant Source in Groundwater-River Integrated Systems Using a Surrogate Transport Model Based Optimization

    Azade Jamshidi, Jamal Mohammad Vali Samani, Hossein Mohammad Vali Samani, Andrea Zanini, Maria Giovanna Tanda, Mehdi Mazaheri
    Journal PapersWater , Volume 12 , Issue 9, 2020 September , {Pages 2415 }

    Abstract

    The paper presents a new approach to identify the unknown characteristics (release history and location) of contaminant sources in groundwater, starting from a few concentration observations at monitoring points. An inverse method that combines the forward model and an optimization algorithm is presented. To speed up the computation, the transfer function theory is applied to create a surrogate transport forward model. The performance of the developed approach is evaluated on two case studies (literature and a new one) under different scenarios and measurement error conditions. The literature case study regards a heterogeneous confined aquifer, while the proposed case study was never investigated before, it involves an aquifer-river integra

    Application of the Quasi-Reversibility Method in Inverse Computation of Temporal and Spatial Pollutant Concentration in Time

    Mohammad Loushabi, Mehdi Mazaheri, Jamal Mohammadvali Samani
    Journal PapersIranian Journal of Soil and Water Research , Volume 51 , Issue 3, 2020 May 21, {Pages 713-726 }

    Abstract

    Pollutants are usually drained off imperceptibly and suddenly in the rivers, which can be of human or natural origin, thus finding information from contaminant source as quickly as possible is important to reduce damage. The pollutant is released by the Advection-Dispersion processes in the river. Therefore, information on contaminant release site and release time can be obtained using inverse solution of the Advection-Dispersion equation. The purpose of this study is to solve Advection-Dispersion Equation (ADE) reversely and to obtain information on the release time and time series data of pollutant concentration discharged into the studied rivers. In this research, the quasi-reversibility method is used to reverse the ADE. In this method,

    Inverse solution of transport equation for pollution source identification in rivers under realistic conditions using the geostatistical method

    Maryam Barati Moghaddam, Mehdi Mazaheri, Jamal Mohammad Vali Samani
    Journal PapersWater and Irrigation Management , Volume 10 , Issue 3, 2020 December 21, {Pages 411-427 }

    Abstract

    The inverse transport problem is very difficult and challenging to solve due to some special characteristics, including the lack of solution, non-uniqueness and instability. Regarding to these complexities, usually some simplifications are made in solution process, which ultimately leads to identification methods that cannot be extended for real-world applications. This study aims to develop a practical method for pollution source identification in rivers under realistic conditions, which considers irregular cross-sections, unsteady flow and both physical and chemical transport processes. The stochastic framework of proposed method provides the possibility of estimation of source characteristics in greater time instances than available obse

    Simultaneous identification of location and intensity of several active pollutant sources in river using mathematical modeling

    Akram Dahmardan, Mehdi Mazaheri, Jamal Mohammadvali Samani
    Journal PapersJournal of Modeling in Engineering , Volume 18 , Issue 60, 2020 May 21, {Pages }

    Abstract

    In the present study, an inverse model was used to identify the location and functions of the intensity of unknown point sources in the river. In this research, the inverse solution of the advection-dispersion equation is carried out using a mathematical approach. The main objectives of this model are to identify the location of the pollutant in the presence of several sources in the river without any prior information from the sources in the entire mathematical framework. The strength point of the inverse model is that, by measuring the concentration-time curve from a few points, the source location can be obtained with the highest accuracy. Also, after finding the source location in the river, the functions of the intensity of the polluta

    شناسایی هم زمان مکان و توابع شدت چندین منبع آلاینده فعال در رودخانه با استفاده از مدلسازی ریاضی‎

    ده مردان, اکرم, مظاهری, محمدولی سامانی, جمال‎
    Journal Papers , , {Pages }

    Abstract

    کاربرد روش شبه‌معکوس‌پذیری در تعیین توزیع زمانی و مکانی غلظت آلاینده به‌صورت معکوس در زمان‎

    لوشابی, مظاهری, محمدولی سامانی, جمال‎
    Journal Papers , , {Pages }

    Abstract

    AN ANALYTICAL SOLUTION TO TWO-DIMENSIONAL UNSTEADY MASS TRANSFER EQUATION WITH ARBITRARY SOURCE TERM IN THE RIVER

    N MASHHADGARME, M MAZAHERI, VSJ MOHAMMAD
    Journal Papers , , {Pages }

    Abstract

    /pro/academic_staff/mmazaheri/publication

    دروس نیمسال جاری

    • دكتري
      هيدروليك محاسباتي 1 ( واحد)
      دانشکده کشاورزی، گروه مهندسي و مديريت آب
    • دكتري
      هيدروليك محاسباتي 1 ( واحد)
    • كارشناسي ارشد
      رياضيات مهندسي ( واحد)

    دروس نیمسال قبل

    • دكتري
      رياضيات مهندسي پيشرفته ( واحد)
      دانشکده کشاورزی، گروه مهندسي و مديريت آب
    • كارشناسي ارشد
      روشهاي محاسباتي در مهندسي آب ( واحد)
    • كارشناسي ارشد
      روشهاي محاسباتي در مهندسي آب ( واحد)
    • دكتري
      مباني انتقال، انتشار و مدل سازي آلاينده ها ( واحد)
    • 1400
      غفوري دستجردي, بهناز
      بررسي اثرات آبدهي رودخانه ولگا بر سطح آب خليج گرگان با استفاده از مدل هيدروديناميك
    • 1397
      ولي زاده, راضيه
      بررسي عدم قطعيت مشخصات هندسي رودخانه بر مدل‌هاي هيدروديناميك و انتقال آلاينده
    • 1398
      رضاوندمنفرد, ندا
      داده ای یافت نشد
      داده ای یافت نشد

    مهم

    جدید

      اطلاعیه ای درج نشده است