نتایج جستجو برای: basically

تعداد نتایج: 15379  

Journal: :wavelets and linear algebra 0
hamide azarmi ph. d. student in ferdowsi university of mashhad radjabali kamyabi gol department of pure mathematics; ferdowsi university of mashhad; mohammad janfada department of pure mathematics;ferdowsi university of mashhad;

‎let $g$ be a locally compact abelian group‎. ‎the concept of a generalized multiresolution structure (gms) in $l^2(g)$ is discussed which is a generalization of gms in $l^2(mathbb{r})$‎. ‎basically a gms in $l^2(g)$ consists of an increasing sequence of closed subspaces of $l^2(g)$ and a pseudoframe of translation type at each level‎. ‎also‎, ‎the construction of affine frames for $l^2(g)$ bas...

2010
G. Sudha

This paper describes a simple method to classify the binary document into scalar type or vector type. Any image can be basically classified into

1986
C.K. Ramachandran

In this paper the author discusses the ancient Ayurvedic system of India which is basically of holistic approach. The contribution of modern scholars are also summed up here.

2005
István Ráth András Schmidt Dávid Vágó

syntax MetaEdit+ uses an own core metamodel, which basically describes a directed graph with typed nodes and edges; nodes are called ’Objects’ and edges are called

Journal: :Qualitative research in medicine & healthcare 2021

This paper describes the burden of receiving immunoglobulin (Ig) treatment from perspective patients diagnosed with a Primary Immunodeficiency (PID). Thirty semi-structured interviews intravenous (n=21) and subcutaneous (n=9) therapy, either at home or in hospital were undertaken. Underpinned by phenomenological theoretical framework, using qualitative, inductive thematic approach to prioritise...

2008
Karl-Georg Schlesinger

This paper agrees basically with the talk of the author at the workshop “Homological Mirror Symmetry and Applications”, Institute for Advanced Study, Princeton, March 2007.

‎Let $G$ be a locally compact abelian group‎. ‎The concept of a generalized multiresolution structure (GMS) in $L^2(G)$ is discussed which is a generalization of GMS in $L^2(mathbb{R})$‎. ‎Basically a GMS in $L^2(G)$ consists of an increasing sequence of closed subspaces of $L^2(G)$ and a pseudoframe of translation type at each level‎. ‎Also‎, ‎the construction of affine frames for $L^2(G)$ bas...

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