The Consistent Criteria of Hypotheses for Gaussian Homogeneous Fields Statistical Structures
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The document presents a theory on consistent criteria for testing hypotheses related to homogeneous Gaussian fields, particularly applicable in engineering reliability predictions. It discusses the definitions and properties of statistical structures in Hilbert spaces and establishes necessary conditions for the existence of consistent criteria. The authors conclude that a statistical structure can admit such criteria only if the probability of error is zero for the given criteria.
![Z.Zerakidze.et al. Int. Journal of Engineering Research and Applications www.ijera.com
ISSN: 2248-9622, Vol. 6, Issue 4, (Part - 3) April 2016, pp.01-04
www.ijera.com 4|P a g e
Example 2. Let ,; RE S be
Borel -algebra of parts of R and mH
are
Lévesque measure on .1, Zmmm The
statistical structure ZmSR m
,,, is strongly
separable. Let is define map
HBHSR ,, like that
.,1, ZmHmm m
We have
ZmHx mH m
,1 e. i. x is
consistent criteria for checking hypotheses such as
the probability of any Kind of errors is zero for
given criteria .
REFERENCES
[1] I. Ibramlalilov A. Skoroklod. Consistent
criteria of parameters of zaclom
processes. Kiev 1980.
[2] Z. Zerakidze, Generalization of Neimann-
Pearson criterion. Collected scientific of
work (In Georgia), P. 63-69 ISNN 1512-
2271. The ministry of Education and
Science of Georgia. Gory state university.
Tbilisi 2005
[3] L.Aleksidze, Z.Zerekidze Construction of
Gaussian Homogenous isotropic statistical
structures. Bull Acad. Sci. Georgia SSR
169 #3 2004. 456-457.
[4] L.EliauriM.Mumladze, Z.Zerekidze.
Consistent criteria for checking
hypotheses. Joznal of Mathemaics and
System science # 3 #10 2013 p. 514-518
[5] Z.Zerekidze. On weakly divisible and
divisible families of probability measures.
Bull. AcodSciGeoergia SSR 113,0984
[6] Z.Zerekidze.Constaction of statistical
structures. Theory of probability and
application v. XV, 3, 1970, p. 573-578.
[7] Z.Zerekidze. Hibbest space of measures.
Ukx Mat. Journ 38.2 Kiev 1986 p. 148-
154
[8] A.Kharazishvil. On the existence of
consistent estimators for stongly separable
family probability measures. The
probability theory and mathecitiralstatistic
,,Hesnierebs” Tbilisi 1989 p. 100-105
[9] Z. Zerakidze, about the conditions
equivalence of Gaussian measures
corresponding to homogeneous fields.
Works of Tbilisi state University v –II,
(1969) 215-220.
[10] C. Krasnitskii. About the conditions
equivalence and orthogonality of
Gaussian measures corresponding to
homogeneous fields. Theory of
probability and application v. XVIII, 3,
1973, 615-623.](https://image.slidesharecdn.com/a0604030104-160728094316/85/The-Consistent-Criteria-of-Hypotheses-for-Gaussian-Homogeneous-Fields-Statistical-Structures-4-320.jpg)
The Consistent Criteria of Hypotheses for Gaussian Homogeneous Fields Statistical Structures
- 1. Z.Zerakidze.et al. Int. Journal of Engineering Research and Applications www.ijera.com ISSN: 2248-9622, Vol. 6, Issue 4, (Part - 3) April 2016, pp.01-04 www.ijera.com 1|P a g e The Consistent Criteria of Hypotheses for Gaussian Homogeneous Fields Statistical Structures Z.Zerakidze, L.Aleksidze, L. Eliauri Gori University, Gori, Georgia ABSTRACT The present theory of consistent criteria for testing hypothesis of statistical structures of homogeneous Gaussian fields can be used, for example, in the reliability prediction of different engineering designs. In the paper there are discussed Gaussian homogeneous fields statistical structures IiSE ii ,,, in Hilbert space of measures. We define the consistent criteria for checking hypotheses such as the probability of any kind of errors is zero for given criteria. We prove necessary and sufficient conditions for the existence of such criteria. Keywords: Consistent criteria, Orthogonal, weakly separable, strongly separable statisticalstructures. Classification cocles62H05, 62H12 Let there is given SE , measurable space and on this space there is given Iii , family of probability measures depended on Ii parameter.Let bring some definition .91 see Definition 1: A statistical structure is called object IiSE ii ,,, . Definition 2: A statistical structure IiSE ii ,,, is called orthogonal (singular) if i and j are orthogonal for each .,, IjIiji Definition 3: A statistical structure IiSE ii ,,, is called separable, if there exists family S-measurable sets IiX i , such thatthe relations are fulfilled: 1. ji ji XIjIi ji if if ,0 ,1 , 2. ,, cXXcardIjIi ji Wh ere c denotes power continuum. Definition 4: A statistical structure IiSE ii ,,, is called weakly separable if there exists family S-measurable sets IiX i , such that the relations are fulfilled: ji ji X ji if if ,0 ,1 . Definition 5: A statistical structure IiSE ii ,,, is called strongly separable is There exists disjoint family S-measurable sets IiX i , such that the relations are fulfilled .1 ji XIi Remark 1: A strong separable there follows weakly separable. From weakly separable there follows orthogonal but not vice versa. Example 1: Let 1,01,0 E and S be Borel -algebra of parts of E. Take the S- measurable sets .1,0,,10, iiyxyxX i Let li be are linear Lebesgue probability measures on .1,0, iX i and 0 l Lebesgue plane probability measures on 1,01,0 E then the statistical structure 1,0,,, ilSE ii is orthogonal, but not weakly separable. Remark 2: The countable family of probability measures ,...2,1,, NNkk strongly separable, weakly separable, separable and orthogonal are equivalent, (see 2,3,4). Remark 3: On an arbitrary set E of continuum power one can define Gaussian homogeneous orthogonal statistical structure having maximal possible power equal to ,2 2 c Gaussian homogeneous weakly statistical structure having maximal possible power equal to ,2 c where C is continuum power (see 3). Remark 4: A.V Ckorokhod proved (in ZFC&CH theory) that continual weakly separable statistical structure as much strongly separable Z.Zerakidze proved (in ZFC&MA theory) that continuum power Borelweakly separable statistical structure as much strongly separable. We deote be (MA) the Martins axiom. RESEARCH ARTICLE OPEN ACCESS
- 2. Z.Zerakidze.et al. Int. Journal of Engineering Research and Applications www.ijera.com ISSN: 2248-9622, Vol. 6, Issue 4, (Part - 3) April 2016, pp.01-04 www.ijera.com 2|P a g e Let be set of Hypotheses and be - algebra of subsets of which contains all finite subsets of . Definition 6: A statistical structure HSE H ,,, will be said to admit a consistent criteria for checking hypotheses, if there exists at least one measurable map ,,,: SE such that .1: HHxxH Remark 5. By Z.Zerekidze was introduced definition a consistent criterion for checking hypotheses (see 2). Definition 7. The following probability HxxPHH : is called the probability of error of the H-th kind for a given criterion . Known the following theorem (see3) Theorem 1. The statistical structure HSE H ,,, admits consistent criteria for checking hypotheses if and only if the probability of error of all kind is equal to zero for the criterion . Let M be a real linear space of all alternating finite measurable on S. Definition 8. A linear subset MM H is called a Hilbert space of measurable if. (1) One can introduce on H M a scale product , , H M , such that H M is the Hilbert space , and for every mutually singular measurable and , H M , the scale product ;0, (2) If H M and ,1f then A Hf MdxxfA where xf is the S-measurable real function and .,, ff Let ,,...,, 21 Ttttt n where T be a closed bounded subset of n R , .,, IiTti t Gaussian real homogenous field on T with zero means ,,0 IitE and correlation function .,,, IiTsTtStRstE iii Iii , be the corresponding probability measures given on S and IiRf n i ,, be spectral densities. We becalled the Fourier transformation of generalized function in the sense of Schwartz as generation Fourier transformation. Let ,, , ~ 2 Iidd ff b n n R R ii where n Rb ,,, ~ the Generalization Fourier transformation of the following function .,,,,,, IjiTttsRtsRtsb ji Then i and j are pairwise orthogonal (see 9,10) and IiSE ii ,,, are the Gaussian orthogonal homogenous fields statistical structures. Next, we consider S-measurable Iixg i , functions such that Ii E ii dxxg . 2 Let H M the set measures defined by the formula 1 , Ii B ii dxxgB where II 1 a countable subsets in I is and 1 . 2 Ii E ii dxxg define a scale product on H M by formula 21 ,, 21 21 IIi E iii dxxgxg Where SBjdxxgB jIi B i j ij B,2,1, t hen H M is a Hilbert space of measures and ,iH Ti H MM where iH M is the Hilbert space of elements the form 1 ,, Ii B ii SBdxxgB E i dxxf , 2 with the scale product on iH M by formula E i dxxfxf ,, 2121 where .2,1, jdxxfB E ijj (see 7). Let i H be a countable family of hypotheses, denote B MFF the set of real
- 3. Z.Zerakidze.et al. Int. Journal of Engineering Research and Applications www.ijera.com ISSN: 2248-9622, Vol. 6, Issue 4, (Part - 3) April 2016, pp.01-04 www.ijera.com 3|P a g e functions f for which E H dxxf i is defined for all ,HH M i where .iH Ni H MM Theorem 2.Let iH Ni H MM be a Hilbert space of measures. The Gaussian homogenous fields orthogonal statistical structures NiSE iH ,,, admits a consistent criteria for checking hypotheses if and only if the correspondence j f defined by the equality HHHf E H Mdxxf ,, is one –to-one , where .B MFf Proof. Sufficiency. For B MFf we define the linear functional f l by the equality ., HfHfH ldxxf Denote as f l a countable subset in N, for which 0 E H dxxf i for f Ii . Let us consider the functional iHf l on HH M to which it corresponds Then for iHHH M 21 , we have . 211 21 E E HHH E HH dxfxfdxxfxfdxxf i Therefore 11 ff H a.e. with respect to the measure iH Let 0 iH f a.e. with respect to the measures iH and E HH dxxf ii , , c HHH dxxfc iii then .,0, jidxxf jiji HH E HH Denote ,0: xfxC ii HH then .,0 jidxxf E HH ji Hence if follows, that jiC ij HH ,0 . On the other hand .0 ij HH CE Therefore the statistical structure NiSE iH ,,, is weakly separable and from Remark 2 follows that the statistical structure NiSE iH ,,, is strongly separable. It is obvious that NiC iH , is a disjunctive family of S-measurable sets and .,1 NiC ii HH Let us definea mappch HBHSE ,, Likethet ., NiHC iH i We have .,1: NiHxx iH j Necessity. Since the statistical structure NiSE iH ,,, admits a consistent criterion for checking hypotheses then the statistical structure NiSE iH ,,, is strongly separable (see 2,4), so there exists S-measurable sets NiX i , such that .,1 NiX iH i We put the measure iH unto the correspondence to a function BH MFI i . Then ., E HHHHHHH iiiiiji dxxIxIdxxI The function BHH MFxIxfxf i 11 we put the measures . 1 iHHH M Then E E E HHHHH xIxfxfdxxIxfdxxf iii 21 211 . 2 iHH M We put the measures ,H M where NIi Hi dxxg i 1 into the correspondence to a function . 1 NIi BHi MFxIxgxf i Then NIi HiH dxxgM i 2 1 11 , we have E IIi IIi HiiHii dxxgxgdxxgxgdxxf ii 21 21 ., 1 11 1 It follows from the proven theorem that the indicated above correspondence puts some functions B MFf into the correspondence to each linear continuous functional .f l If in B MF we identify function considering with respect the measures NiSE iH ,,, the correspondence will be bijecfive. The Theorem 2 is proved.
- 4. Z.Zerakidze.et al. Int. Journal of Engineering Research and Applications www.ijera.com ISSN: 2248-9622, Vol. 6, Issue 4, (Part - 3) April 2016, pp.01-04 www.ijera.com 4|P a g e Example 2. Let ,; RE S be Borel -algebra of parts of R and mH are Lévesque measure on .1, Zmmm The statistical structure ZmSR m ,,, is strongly separable. Let is define map HBHSR ,, like that .,1, ZmHmm m We have ZmHx mH m ,1 e. i. x is consistent criteria for checking hypotheses such as the probability of any Kind of errors is zero for given criteria . REFERENCES [1] I. Ibramlalilov A. Skoroklod. Consistent criteria of parameters of zaclom processes. Kiev 1980. [2] Z. Zerakidze, Generalization of Neimann- Pearson criterion. Collected scientific of work (In Georgia), P. 63-69 ISNN 1512- 2271. The ministry of Education and Science of Georgia. Gory state university. Tbilisi 2005 [3] L.Aleksidze, Z.Zerekidze Construction of Gaussian Homogenous isotropic statistical structures. Bull Acad. Sci. Georgia SSR 169 #3 2004. 456-457. [4] L.EliauriM.Mumladze, Z.Zerekidze. Consistent criteria for checking hypotheses. Joznal of Mathemaics and System science # 3 #10 2013 p. 514-518 [5] Z.Zerekidze. On weakly divisible and divisible families of probability measures. Bull. AcodSciGeoergia SSR 113,0984 [6] Z.Zerekidze.Constaction of statistical structures. Theory of probability and application v. XV, 3, 1970, p. 573-578. [7] Z.Zerekidze. Hibbest space of measures. Ukx Mat. Journ 38.2 Kiev 1986 p. 148- 154 [8] A.Kharazishvil. On the existence of consistent estimators for stongly separable family probability measures. The probability theory and mathecitiralstatistic ,,Hesnierebs” Tbilisi 1989 p. 100-105 [9] Z. Zerakidze, about the conditions equivalence of Gaussian measures corresponding to homogeneous fields. Works of Tbilisi state University v –II, (1969) 215-220. [10] C. Krasnitskii. About the conditions equivalence and orthogonality of Gaussian measures corresponding to homogeneous fields. Theory of probability and application v. XVIII, 3, 1973, 615-623.