Applied Mathematics for Environmental Problems / edited by María Isabel Asensio, Albert Oliver, José Sarrate.

Format:

Book

Contributor:

Asensio, María Isabel, editor.

Oliver, Albert, editor.

Sarrate, José, editor.

Series:

ICIAM 2019 SEMA SIMAI Springer Series, 2662-7191 ; 6

Language:

English

Subjects (All):

Mathematics.

Environmental sciences--Mathematics.

Environmental sciences.

Mathematical analysis.

Differential equations.

Earth sciences.

Geography.

Applications of Mathematics.

Mathematical Applications in Environmental Science.

Analysis.

Differential Equations.

Earth and Environmental Sciences.

Local Subjects:

Applications of Mathematics.

Mathematical Applications in Environmental Science.

Analysis.

Differential Equations.

Earth and Environmental Sciences.

Physical Description:

1 online resource (93 pages)

Edition:

1st ed. 2021.

Place of Publication:

Cham : Springer International Publishing : Imprint: Springer, 2021.

Summary:

This book contains some contributions presented at the Applied Mathematics for Environmental Problems minisymposium during the International Congress on Industrial and Applied Mathematics (ICIAM) held July 15-19, 2019 in Valencia, Spain. The first paper addresses a simplified physical wildfire spread model, based on partial differential equations solved with finite element methods and integrated into a GIS to provide a useful and efficient tool. The second paper focuses on one of the causes of the unpredictable behavior of wildfire, fire-spotting, through a statistical approach. The third paper addresses low -level wind shear which represents one of the most relevant hazards during aircraft takeoff and landing. It presents an experimental wind shear alert system that is based on predicting wind velocities obtained from the Harmonie-Arome model. The last paper addresses the environmental impact of oil reservoirs. It presents high-order hybridizable discontinuous Galerkin formulation combined with high-order diagonally implicit Runge-Kutta schemes to solve one-phase and two-phase flow problems through porous media. All the contributions collected in this volume are interesting examples of how mathematics and numerical modelling are effective tools in the field of environmental problems.

Contents:

Asensio, M.I. et al., PhyFire: an online GIS-integrated wildfire spread simulation tool based on a semiphysical model

Egorova, V.N. et al., Physical parametrisation of fire-spotting for operational wildfire simulators

Suárez Molina, D. and Suárez González, J.C., Wind shear forecast in GCLP and GCTS airports

Costa-Solé, A. et al., One-phase and two-phase flow simulation using high-order HDG and high-order diagonally implicit time integration schemes.

ISBN:

3-030-61795-5

OCLC:

1241451018