mathematical 
Motivated by the physical concept of special geometry, two mathematical constructions are studied which relate real hypersurfaces to tube domains and complex Lagrangian cones, respectively.


We prove that the moduli space of mathematical instanton bundles on P3 with c2 = 5 is smooth.


The mathematical concept of frames is utilized in the analysis of the properties of the sequence of sampling functions.


Mathematical details and numerical examples are included.


We give general mathematical results concerning oscillating singularities and we study examples of functions composed only of oscillating singularities.


The mathematical theory usually addresses this problem in infinite dimensions (typically in L2 (?) or ?2(?)), whereas numerical methods have to operate with a finitedimensional model.


In this paper, a mathematical model with respect to the optimal identification of the thermodynamic parameters is established.


In this paper, a new mathematical model is constructed on the basis of an earlier paper [1].


Analyses for a mathematical model of the pattern formation on shells of molluscs


This paper analyses a mathematical model of the pattern formation on the shell of molluscs which is actually a kind of reactiondiffusion system.


A mathematical analysis for a diffusive epidemic model with crisscross dynamics


The objective of this paper is to deal with a kind of fuzzy linear programming problem based on intervalvalued fuzzy sets (IVFLP) through the medium of procedure that turns IVFLP into parametric linear programming via the mathematical programming.


In this paper a new mathematical model of secondary frost heave is presented.


By using the mathematical software Mathematica, the author gets the following results in this paper.


Scale and time effects on mathematical models for transport in the environment


The purpose of this paper is to analyse mathematical models used in environmental modelling.


We propose a mathematical model for rescue center location with the considerations of emergency occurrence probability, catastrophe diffusion function and rescue function.


Because the catastrophe diffusion and rescue functions are both nonlinear and timevariable, it cannot be solved by common mathematical programming methods.


Many studies, both experimental and numerical, were devoted to the electric current of corona discharge and some mathematical models were proposed to express it.


Results of experiments made it possible to obtain mathematical models and to analyse the interactions between all factors.

