泛函度

Dag Normann
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引用次数: 7

摘要

在本文中,我们将讨论与高等类型的普通对象的递归有关的一些程度论性质的问题。Harrington[2]和loeenthal[6]利用递归模子个体证明了Post问题和极小对问题的一些结果。我们的学位将是那些从kleene -递归模个体获得的学位。为了解决我们的问题,我们必须给ZFC增加一些额外的力量。我们首先假设V = L,然后我们将自己限制在递归良序和马丁公理的情况下。我们假设熟悉Kleene[3]中提出的高级类型的递归理论。在Harrington[2]、Moldestad[9]和Normann[11]中可以找到进一步的背景。我们将调查这些论文中我们需要的部分。在第1节中,我们将给出后面使用的参数的一般背景。在第2节中,我们证明了假设V = L的引理。在第3节中,假设V = L,我们用有限伤害法解决了Post问题和另一个问题。因此,我们将描述第4节中更复杂的优先级参数所需的一些方法,其中我们给出了泛函扩展r.e.度的最小对问题的解决方案。在第5节中,我们将看到,如果马丁公理成立,并且我们在3E中有最小的tp(1)递归良序,我们可以使用与第3部分和第4部分相同的参数。
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Degrees of functionals

In this paper we will discuss some problems of degree-theoretic nature in connection with recursion in normal objects of higher types.

Harrington [2] and Loewenthal [6] have proved some results concerning Post's problem and the Minimal Pair Problem, using recursion modulo subindividuals. Our degrees will be those obtained from Kleene-recursion modulo individuals. To solve our problems we then have to put some extra strength to ZFC. We will first assume V = L, and then we restrict ourselves to the situation of a recursive well-ordering and Martin's axiom.

We assume familiarity with recursion theory in higher types as presented in Kleene [3]. Further backround is found in Harrington [2], Moldestad [9] and Normann [11]. We will survey the parts of these papers that we need.

In Section 1 we give the general background for the arguments used later. In Section 2 we prove some lemmas assuming V = L. In section 3, assuming V = L we solve Post's problem and another problem using the finite injury method. We will thereby describe some of the methods needed for the more complex priority argument of Section 4 where we give a solution of the minimal pair problem for extended r.e. degress of functionals.

In Section 5 we will see that if Martin's Axiom holds and we have a minimal well-ordering of tp (1) recursive in 3E, we may use the same sort of arguments as in parts 3 and 4.

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Author index Recursive models for constructive set theories Monadic theory of order and topology in ZFC A very absolute Π21 real singleton Morasses, diamond, and forcing
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