Proton–proton chain reaction

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Logarithm of the relative energy output (e) of proton-proton (PP), CNO and Triple-a fusion processes at different temperatures. The dashed line shows the combined energy generation of the PP and CNO processes within a star. At the Sun's core temperature, the PP process is more efficient. Nuclear energy generation.svg
Logarithm of the relative energy output (ε) of proton–proton (PP), CNO and Triple-α fusion processes at different temperatures. The dashed line shows the combined energy generation of the PP and CNO processes within a star. At the Sun's core temperature, the PP process is more efficient.
Scheme of the proton-proton branch I chain reaction Fusion in the Sun.svg
Scheme of the proton–proton branch I chain reaction

The proton–proton chain reaction is one of two known sets of nuclear fusion reactions by which stars convert hydrogen to helium. It dominates in stars with masses less than or equal to that of the Sun, [1] whereas the CNO cycle, the other known reaction, is suggested by theoretical models to dominate in stars with masses greater than about 1.3 times that of the Sun. [2]

Contents

In general, proton–proton fusion can occur only if the kinetic energy (i.e. temperature) of the protons is high enough to overcome their mutual electrostatic or Coulomb repulsion. [3]

In the Sun, deuterium-producing events are rare. Diprotons are the much more common result of proton–proton reactions within the star, and diprotons almost immediately decay back into two protons. Since the conversion of hydrogen to helium is slow, the complete conversion of the hydrogen in the core of the Sun is calculated to take more than ten billion years. [4]

Although often called the "proton–proton chain reaction", it is not a chain reaction in the normal sense of the word (at least not branch I – in branches II and III, helium, which is the product, also serves as a catalyst). It does not produce particles that go on to induce the reaction to continue (such as neutrons given off during fission). In fact, the rate is self-limiting because the heat produced tends toward reducing the density. It is however a chain (like a decay chain) and a reaction, or more accurately a branched chain of reactions starting with two protons coming together and yielding deuterium.

History of the theory

The theory that proton–proton reactions are the basic principle by which the Sun and other stars burn was advocated by Arthur Eddington in the 1920s. At the time, the temperature of the Sun was considered to be too low to overcome the Coulomb barrier. After the development of quantum mechanics, it was discovered that tunneling of the wavefunctions of the protons through the repulsive barrier allows for fusion at a lower temperature than the classical prediction.

Even so, it was unclear how proton–proton fusion might proceed, because the most obvious product, helium-2 (diproton), is unstable and almost instantly dissociates back into two protons. In 1939, Hans Bethe proposed that one of the protons could decay by beta emission into a neutron via the weak interaction during the brief moment of fusion, making deuterium a vital product in the chain. [5] This idea was part of the body of work in stellar nucleosynthesis for which Bethe won the Nobel Prize in Physics in 1967.

The proton–proton chain reaction

The first step in all the branches is the fusion of two protons into deuterium. As the protons fuse, one of them undergoes beta plus decay, converting into a neutron by emitting a positron and an electron neutrino. [6]

p  +  p   2
1
H
+
e+
+
ν
e

The positron will probably annihilate with an electron from the environment into two gamma rays. Including this annihilation the whole reaction has a Q value (released energy) of 1.442 MeV. [6]

This reaction is extremely slow due to it being initiated by the weak nuclear force. The average proton in the core of the Sun waits 9 billion years before it successfully fuses with another proton. It has not been possible to measure the cross-section of this reaction experimentally because of these long time scales. [7]

After it is formed, the deuterium produced in the first stage can fuse with another proton to produce the light isotope of helium, 3
He
:

2
1
D
 
+  1
1
H
 
  3
2
He
 
+ 
γ
 
+ 5.49 MeV

This process, mediated by the strong nuclear force rather than the weak force, is extremely fast by comparison to the first step. It is estimated that, under the conditions in the Sun's core, each newly created deuterium nucleus exists for only about four seconds before it is converted to helium-3.

In the Sun, each helium-3 nucleus produced in these reactions exists for only about 400 years before it is converted into helium-4. [8] Once the helium-3 has been produced, there are four possible paths to generate 4
He
. In p–p I, helium-4 is produced by fusing two helium-3 nuclei; the p–p II and p–p III branches fuse 3
He
with pre-existing 4
He
to form beryllium-7, which undergoes further reactions to produce two helium-4 nuclei.

In the Sun, 4
He
synthesis via branch p–p I occurs with a frequency of 83.30 percent, p–p II with 16.68 percent, and p–p III with 0.02 percent. [9]

There is also the extremely rare p–p IV branch. Other even rarer reactions may occur. The rate of these reactions is very low due to very small cross-sections, or because the number of reacting particles is so low that any reactions that might happen are statistically insignificant. This is partly why no mass-5 or mass-8 elements are seen. While the reactions that would produce them, such as a proton + helium-4 producing lithium-5, or two helium-4 nuclei coming together to form beryllium-8, may actually happen, these elements are not detected because there are no stable (or even particle-bound) isotopes of atomic masses 5 or 8; the resulting products immediately decay into their initial reactants.

The overall reaction is:

4 ¹H⁺ → ⁴He²⁺ + 2e⁺ + 2νₑ

The p–p I branch

3
2
He
 
+  3
2
He
 
  4
2
He
 
+ 2  1
1
H
 
+ 12.86 MeV

The complete p–p I chain reaction releases a net energy of 26.732 MeV. [10] Two percent of this energy is lost to the neutrinos that are produced. [11] The p–p I branch is dominant at temperatures of 10 to 14  MK . Below 10 MK, the p–p chain does not produce much 4
He
.[ citation needed ]

The p–p II branch

Proton-proton II chain reaction Proton-Proton II chain reaction.svg
Proton–proton II chain reaction
3
2
He
 
+  4
2
He
 
  7
4
Be
 
+ 
γ
7
4
Be
 
+ 
e
 
  7
3
Li
 
+ 
ν
e
 
+ 0.861 MeV / 0.383 MeV
7
3
Li
 
+  1
1
H
 
 2  4
2
He

The p–p II branch is dominant at temperatures of 14 to 23 MK.

Note that the energies in the equation above are not the energy released by the reaction. Rather, they are the energies of the neutrinos that are produced by the reaction. 90 percent of the neutrinos produced in the reaction of 7
Be
to 7
Li
carry an energy of 0.861 MeV, while the remaining 10 percent carry 0.383 MeV. The difference is whether the lithium-7 produced is in the ground state or an excited (metastable) state, respectively.

The p–p III branch

Proton-proton III chain reaction Proton-Proton III chain reaction.svg
Proton–proton III chain reaction
3
2
He
 
+  4
2
He
 
  7
4
Be
 
+ 
γ
7
4
Be
 
+  1
1
H
 
  8
5
B
 
+ 
γ
8
5
B
 
    8
4
Be
 
+ 
e+
 
+ 
ν
e
 
8
4
Be
 
   2  4
2
He

The p–p III chain is dominant if the temperature exceeds 23 MK.

The p–p III chain is not a major source of energy in the Sun (only 0.11 percent), but it was very important in the solar neutrino problem because it generates very high energy neutrinos (up to 14.06 MeV).

The p–p IV (Hep) branch

This reaction is predicted theoretically, but it has never been observed due to its rarity (about 0.3  ppm in the Sun). In this reaction, helium-3 captures a proton directly to give helium-4, with an even higher possible neutrino energy (up to 18.8 MeV).

3
2
He
 
+  1
1
H
 
  4
2
He
 
+ 
e+
 
+ 
ν
e
 
+ 18.8 MeV

Energy release

Comparing the mass of the final helium-4 atom with the masses of the four protons reveals that 0.7 percent of the mass of the original protons has been lost. This mass has been converted into energy, in the form of gamma rays and neutrinos released during each of the individual reactions. The total energy yield of one whole chain is 26.73 MeV.

Energy released as gamma rays will interact with electrons and protons and heat the interior of the Sun. Also kinetic energy of fusion products (e.g. of the two protons and the 4
2
He
from the p–p I reaction) increases the temperature of plasma in the Sun. This heating supports the Sun and prevents it from collapsing under its own weight.

Neutrinos do not interact significantly with matter and therefore do not help support the Sun against gravitational collapse. Their energy is lost: the neutrinos in the p–p I, p–p II, and p–p III chains carry away 2.0%, 4.0%, and 28.3% of the energy in those reactions, respectively. [12]

The PEP reaction

Proton-proton and electron-capture chain reactions in a star Proton proton cycle.svg
Proton–proton and electron-capture chain reactions in a star

Deuterium can also be produced by the rare pep (proton–electron–proton) reaction (electron capture):

1
1
H
 
+ 
e
 
+  1
1
H
 
  2
1
D+
 
+ 
ν
e

In the Sun, the frequency ratio of the pep reaction versus the p–p reaction is 1:400. However, the neutrinos released by the pep reaction are far more energetic: while neutrinos produced in the first step of the p–p reaction range in energy up to 0.42 MeV, the pep reaction produces sharp-energy-line neutrinos of 1.44 MeV. Detection of solar neutrinos from this reaction were reported by the Borexino collaboration in 2012. [13]

Both the pep and p–p reactions can be seen as two different Feynman representations of the same basic interaction, where the electron passes to the right side of the reaction as a positron. This is represented in the figure of proton–proton and electron-capture chain reactions in a star, available at the NDM'06 web site. [14]

See also

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He
, with a half-life of 7.6×10−22 s, although it is possible that 2
He
has an even shorter half-life.

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References

  1. "The Proton–Proton Chain". Astronomy 162: Stars, Galaxies, and Cosmology. Archived from the original on 2016-06-20. Retrieved 2018-07-30.
  2. Salaris, Maurizio; Cassisi, Santi (2005). Evolution of Stars and Stellar Populations. John Wiley and Sons. pp. 119–121. ISBN   0-470-09220-3.
  3. Ishfaq Ahmad, The Nucleus, 1: 42, 59, (1971), The Proton type-nuclear fission reaction.
  4. Kenneth S. Krane, Introductory Nuclear Physics, Wiley, 1987, p. 537.
  5. Hans A. Bethe, Physical Review55:103, 434 (1939); cited in Donald D. Clayton, Principles of Stellar Evolution and Nucleosynthesis, The University of Chicago Press, 1983, p. 366.
  6. 1 2 Iliadis, Christian. (2007). Nuclear physics of stars. Weinheim: Wiley-VCH. ISBN   9783527406029. OCLC   85897502.
  7. Phillips, A. C. (Anthony C.), –2002. (1999). The physics of stars (2nd ed.). Chichester: John Wiley. ISBN   0471987972. OCLC   40948449.CS1 maint: multiple names: authors list (link)
  8. This time and the two other times above come from: Byrne, J. Neutrons, Nuclei, and Matter, Dover Publications, Mineola, NY, 2011, ISBN   0486482383, p 8.
  9. Adelberger, Eric G.; et al. (12 April 2011). "Solar fusion cross sections. II. The pp chain and CNO cycles". Reviews of Modern Physics. 83 (1): 201. arXiv: 1004.2318 . Bibcode:2011RvMP...83..195A. doi:10.1103/RevModPhys.83.195.
  10. LeBlanc, Francis. An Introduction to Stellar Astrophysics.
  11. Burbidge, E.; Burbidge, G.; Fowler, William; Hoyle, F. (1 October 1957). "Synthesis of the Elements in Stars". Reviews of Modern Physics. 29 (4): 547–650. Bibcode:1957RvMP...29..547B. doi:10.1103/RevModPhys.29.547. This value excludes the 2% neutrino energy loss.
  12. Claus E. Rolfs and William S. Rodney, Cauldrons in the Cosmos, The University of Chicago Press, 1988, p. 354.
  13. Bellini, G.; et al. (2 February 2012). "First Evidence of pep Solar Neutrinos by Direct Detection in Borexino". Physical Review Letters. 108 (5): 051302. arXiv: 1110.3230 . Bibcode:2012PhRvL.108e1302B. doi:10.1103/PhysRevLett.108.051302. PMID   22400925.
  14. Int'l Conference on Neutrino and Dark Matter, Thursday 07 Sept 2006, https://indico.lal.in2p3.fr/getFile.py/access?contribId=s16t1&sessionId=s16&resId=1&materialId=0&confId=a05162 Session 14.