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Let $ H $ be a class of multi-class predictor hypotheses; namely, each $ h $ H $ is a function of $ X $ at $ (k) $.
Note the Natarajan dimension of $ H $ through Ndim (H) $. Please prove the following lemma.
$ | H | le | X | ^ {Ndim (H)} cdot k ^ {2Ndim (H)} $
The lemma is in the book "Understanding machine learning: from theory to algorithms". You have just searched for keywords "Lemma 29.4".
Show that for each natural number n, with n> = 3, (1+ (1 / n) ^ n <n.
I've taken the basic step, (4/3) ^ 3 <3 so that's fine, but I'm confused about the inductive step.
The inductive hypothesis is (1+ (1 / k) ^ k <k, and the inductive conclusion is (1+ (1 / (k + 1))) ^ k + 1 <k + 1. I n & # 39 can not understand how to reach the IC since the IH.
I've tried to multiply both sides by (1+ (1 / k), but that just gives (1+ (1 / k)) ^ k + 1 <k + 1. Idk what I'm supposed to do right here?
Let (X,$ μ_1 $), (X,$ μ_2 $), (Y,$ Ω_1 $), (Y, $ Ω_2 $) Topological spaces.
Let $ μ_1 $ , $ Ω_1 $ to be finer than $ μ_2 $ ,$ Ω_2 $ (that means: $ μ_1 $ $ subset $ $ μ_2 $ , same $ Ω_1 $ , $ Ω_2 $. Suppose that f: (X,$ μ_1 $) -> (Y,$ Ω_2 $) is continuous.
Prove that: 1. g: (X,$ μ_2 $) -> (Y,$ Ω_2 $) is a continuous function.
2. h: (X,$ μ_1 $) -> (Y,$ Ω_1 $) is a continuous function.
In 1 I said: f is continuous, so according to the definition, for every U $ in $ Ω_2, f ^ {- 1} (U) $ in $ μ_1.
We know that $ μ_1 $ $ in $ $ μ_2 $ then f ^ {- 1} (U) $ in $ $ μ_2 $ . So, according to the definition of a continuous function, we get that g is continuous.
Is it correct?
In 2, I did not manage to make the link between the definitions, 1 and what is given.
$ 1. $ Prove it $ {(i ^ {2n} +1) (i ^ n + 2): n in mathbb {N} } = {0,2,6 } $.
$ 2. $ Prove it $ forall m in mathbb {Z}, i ^ m = begin {case} 1, & text {if $ m equiv 0 pmod 4 $} \ i, & text {if $ m equiv 1 pmod 4 $} \ – 1, & text {if $ m equiv 2 pmod 4 $} \ – i, & text {if $ m equiv 3 pmod 4 $} \ end {cases} $
Here are my proofs.
Given that $ L = lbrace 0 ^ n1 ^ n: n geq 0 rbrace $ is a non-contextual non-regular language, proves that $ texttt {prefix} (L) $ is regular.
Until now, I've planned that grammar to produce this language is:
$ S rightarrow 0S1 thinspace | thinspace epsilon $
Would you like to prove $ texttt {prefix} (L) $ is regular, as you would with any language, which proves that $ Sigma ^ star $ = $ texttt {prefix} (L) $, or by induction on the length of words in $ texttt {prefix} (L) $.
Prove it $ mathbb {Z} [ sqrt {-2}] $ is a Euclidean domain and $ mathbb {Z} [ sqrt {-10}] $ is not.
I know that in general, to prove that something is a Euclidean domain, I have to prove the existence of a divisional algorithm involving a norm. In the case of $ mathbb {Z} [ sqrt {-2}], $ the norm is $ a ^ 2 + 2b ^ 2. $ I know how to prove that whole Gaussian numbers $ mathbb {Z} [ sqrt {-1}] $ is a Euclidean domain, but I am not sure that the evidence on this subject relates to this evidence.
In addition, prove that $ mathbb {Z} [ sqrt {-10}] $ This is not a Euclidean domain involves determining which ideals are not key, but I'm not sure how to find a non-main ideal. I think that should be generated by at least two elements of $ mathbb {Z} [ sqrt {-10}] $ although.
As I am a novice in abstract algebra, I would like, if possible, more than just a hint.
Let $ a, b, c> $ 0 to be three real numbers such as $ a + b + c = $ 1. I want to prove that
$$ frac {a} {a ^ 2 + b ^ 3 + c ^ 3} + frac {b} {b ^ 2 + a ^ 3 + c ^ 3} + frac {c} {c ^ 2 + a ^ 3 + b ^ 3} the frac {1} {5abc}. $$
My attempt: The use of AM-GM on each denominator gives (here, LHS refers to the left side)
$$ LHS le frac {1} {3a ^ { frac12} bc} + frac {1} {3b ^ { frac12} ac} + frac {1} {3c ^ { frac12} ab}. $$
However, I think the last phrase may become larger than $ frac {1} {5abc} $. Since if we multiply with $ 3abc $ then the initial inequality is:
$$ sqrt a + sqrt b + sqrt the frac35 $$
However, as $ a, b, c <$ 1, $$ sqrt a + sqrt b + sqrt c> a + b + c = 1> frac35. $$
Language: Logic of single-sorted first-order predicates
Primitives: $ =; in, emptyset, $ 0 where the last two are constants.
To define: $ set (x) equiv_ {df} exists y (x in y) $
Axioms: ID +
1. Low extensionality:
$ non-empty (x) land forall z (z in x leftrightarrow z in y) to x = y $
2. Foundation: $ exists y (y in x) to exists y in x ( no exists c (c in y earth c in x)) $
3. Class comprehension: if $ phi $ is a formula in which $ x $ is not free, so all closures of: $$ exists x forall y (y in x leftrightarrow set (y) land phi) $$; are axioms.
To define: $ x = {y | phi } equiv_ {df} forall y (y in x leftrightarrow set (y) land phi) $
4. Empty sets: $ 0 neq emptyset land forall x (empty (x) leftrightarrow x = 0 lor x = emptyset) $
5. Twinning: $ forall sets x, y (set ( {x, y })) $
6. Sub-assemblies: $ set (x) land y subseteq x to set (y) $
7. Power: $ set (x) to set ( mathcal P (x)) $
8. Union: $ set (x) to set ( bigcup (x)) $
To define: $ x = y ^ o equiv_ {df} x = o lor (not empty (x) land forall z in TC (x) (empty (z) to z = o)) $
Or $ TC $ means transitive closure.
9. Modified size limit: $ | x ^ o | <| V ^ o | set (x ^ o) $
Or $ V ^ o = {x ^ o | set (x ^ o) } $
To define:
$ x ^ 0 cong y emptyset equiv_ {df} TC (x ^ 0) is $$ in $–$ isomorphic to TC (y ^ emptyset) $
Or $ TC $ means transitive closure.
10. Describability: if $ phi ^ 0 $ is a parameterless formula in which all variables are set to 0, and if $ phi ^ emptyset $ is the formula obtained from $ phi ^ 0 $ simply replacing each occurrence of the symbol 0 with the symbol $ emptyset $then:
$ {x ^ 0 | phi ^ 0 } cong {x ^ emptyset | phi ^ emptyset } to {x ^ 0 | phi ^ 0 }, {x ^ emptyset | phi ^ emptyset } text {are sets} $
, is an axiom.
Question: would this theory prove the coherence of "ZFC + there is an inaccessible set"?
Task: prove that each bijection of the set in itself is representable as a composition of two symmetries.
Proof (where I am now and looking for ideas):
1) Write the task in mathematical language
Let $ f $ be bijection of the whole $ X $ in itself: $ f: X leftrightarrow X $.
Let $ h $ to be a symmetry on the board $ X $ that means: $ h: X leftrightarrow X $ and $ h ^ {- 1} = h $.
Let $ g $ to be a symmetry on the board $ X $ that means: $ g: X leftrightarrow X $ and $ g ^ {- 1} = g $.
2) Need to prove that $$ forall f: X leftrightarrow X exists (h: X leftrightarrow X, h ^ {- 1} = h ; and ; g: X leftrightarrow X, g ^ {- 1} = g): f = g circ h. $$
3) proof
Prove that there is $ h $ and $ g $ so that $ f = g circ h $.
Here is where I get into the problem.
We know that:
Help me find the right way to prove it for each bijection $ X leftrightarrow X $ there is a way to find two compound symmetries do the same mapping as $ f $.
This is related to a mission, but I would still appreciate some help to formalize the proof by private message or on this subject.
The question is whether Rice's theorem applies to certain properties. For example, for a structural property such as the number of states. I would say that:
For me, this seems like a good argument, but the question is to award a substantial score of 10, and I do not think it's enough for 10 points. Am I missing out on a rigorous argument that I need to include to give my explanation? Clear as water of rock?
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