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Extensions of No-Go Theorems to Many Signal Systems.
TRAVELING WAVES IN 2D REACTIVE BOUSSINESQ SYSTEMS WITH NO-SLIP BOUNDARY CONDITIONS
TRAVELING WAVES 2D REACTIVE BOUSSINESQ SYSTEMS NO-SLIP BOUNDARY CONDITIONS
2015/7/14
We consider systems of reactive Boussinesq equations in two dimensional strips that are not aligned with gravity s direction. We prove that for any width of such strips and for arbitrary Rayleigh and ...
TRA VELING W A VES IN 2D REACTIVE BOUSSINESQ SYSTEMS WITH NO-SLIP BOUNDAR Y CONDITIONS
TRAVELING WAVES IN 2D REACTIVE BOUSSINESQ SYSTEMS NO-SLIP BOUNDARY CONDITIONS
2014/4/4
We consider systems of reactive Boussinesq equations in two dimensional strips that are not aligned with gravity's direction. We prove that for any width of such strips and for arbitrary Rayleigh and ...
Testing the null hypothesis of no cointegration against seasonal fractional cointegration
Seasonal fractional cointegration Long memory Seasonality
2010/9/10
In this article we propose a procedure for testing the null hypothesis of no cointegration against the alternative of seasonal fractional cointegration. It is a twostep procedure based on the univaria...
Corrigendum on the paper "An application of almost increasing and $\delta$- quasi-monotone sequences'' published in JIPAM, Vol.1, No.2. (2000), Article 18
Almost Increasing Sequences Quasi-monotone Sequences Absolute Summability Factors Infinite Series
2008/7/2
This paper is a corrigendum on a paper published in an earlier volume of
JIPAM, `An application of almost increasing and
d -quasi-monotone sequences' published in JIPAM, Vol.1, No.2. (2000), Artic...
Corrigendum on the paper: 'Lower Bounds for the Infimum of the Spectrum of the Schr鮠inger Operator in \mathbb{R}^N and the Sobolev Inequalities' published in JIPAM, vol. 3, no. 4. (2002), Article 63
Optimal lower bound infimum spectrum Schrõ dinger operator Sobolev inequality
2008/7/2
This paper is a corrigendum on a paper published in an earlier volume of JIPAM, 'Lower Bounds for the Infimum of the Spectrum of the Schrodinger Operator in and the Sobolev Inequalities' published in...
The Erd\H{o}s-S\'{o}s Conjecture for Graphs Whose Complements Contain No $\large \pmb {C_4}$
Graph tree packing
2007/12/11
Erd\H{o}s and S\'{o}s conjectured in 1963 (see [1],Problem 12 in 247) that every graph $G$ on $n$ vertices with size\frac{1}{2}n(k-1)$ contains every tree $T$ of size $k$. Inthis paper, we prove the ...